Adaptive digital beamforming architecture for target detection and angle estimation in multiple mainlobe and sidelobe jamming

ABSTRACT

A system and method for detecting a radar target of interest in the presence of radar jamming interference include a sub-array beamformer, a sum and difference beamformer, a weight calculator, a composite beamformer, and a monopulse ratio calculator. A plurality of sub-arrays is formed from antenna array element data. Respective sum and difference beams are formed for each of the plurality of sub-arrays. A single weight is formulated from the sum and difference beams, respectively. Composite sum beams are formed in accordance with the sum weights and the sum beams, and composite difference beams are formed in accordance with the difference weights and the difference beams. Composite beams are formed such that at least one null of each of the composite beams is steered toward an interference and a boresight gain of each of the composite beams is maintained.

CROSS-REFERENCE TO RELATED APPLICATIONS AND CLAIM FOR PRIORITY

[0001] This application is a continuation-in-part and claims priority from U.S. patent application Ser. No. 09/882,348, filed Jun. 15, 2001 and U.S. patent application Ser. No. 10/107,977, filed Mar. 27, 2002.

FIELD OF THE INVENTION

[0002] This invention generally relates to radar systems and techniques for determining target location and more specifically to a radar processing system and method for detecting and maintaining targets in the presence of multiple mainlobe and multiple sidelobe interference sources.

BACKGROUND

[0003] One of the problems facing surveillance and fire control radar systems today is target detection and estimation of target angle in the presence of severe jamming interference. Typically, jamming is in the form of a high power transmission designed to impair a radar system's performance. Jamming may comprise a signal modulated with noise or other disruptive information. The object of typical jammers is to impair the performance of a radar system's receiving electronics and/or obscure the display. The source of jamming interference may be mobile or may be relatively stationary (e.g., land based systems).

[0004] The problem of target detection and estimation of target angle in the presence of jamming interference is particularly important for next generation radar systems used in missile defense. Recently, there has been increases emphasis toward a goal of implementing radar systems in airborne and spaceborne platforms for large area surveillance in addition to surface radars which can be ground based or shipboard based. A problem associated with achieving this goal is developing a radar system capable of detecting targets while rejecting unwanted information such as jammers and clutter.

[0005] Radar systems implementing antenna arrays typically form beam patterns comprising a central beam, i.e., main lobe, and surrounding minor lobes, i.e., sidelobes. Typically, it is desired to have a narrow mainlobe having high gain, and low sidelobes. To detect a desired target and reject unwanted clutter and jamming, the mainlobe is steered toward the target of interest. The desired target within the mainlobe is enhanced and the response to clutter and jamming outside the mainlobe is attenuated. However, if a jammer is located within the mainlobe, it becomes difficult to detect the target of interest. This problem is exacerbated in the situation where multiple jammers exist.

[0006] Radar systems have been developed to cancel a single jammer in the mainlobe. Such a system is described in U.S. Pat. No. 5,600,326 issued to Yu et al., which is incorporated herein by reference in its entirety. However, these systems require a priori knowledge of the jammer location. Thus, a need exists for a radar system having the ability to detect a target of interest in the presence of multiple mainlobe jammers. A need also exists for a radar system having the capability to cancel multiple mainlobe jammers without requiring a priori knowledge of jammer locations. Further, a need exists for a radar system having the capability to detect a target of interest in the presence of multiple mainlobe and multiple sidelobe jammers.

SUMMARY OF THE INVENTION

[0007] A system and method for detecting a radar target of interest in the presence of radar jamming interference include a sub-array beamformer, a sum and difference beamformer, a weight calculator, a composite beamformer, and a monopulse ratio calculator. A plurality of sub-arrays is formed from antenna array element data. Respective sum and difference beams are formed for each of the plurality of sub-arrays. Sum and difference weights are formulated in accordance with the sum and difference beams, respectively. Composite sum beams are formed in accordance with the sum weights and the sum beams, and composite difference beams are formed in accordance with the difference weights and the difference beams. Composite beams are formed such that at least one null of each of the composite beams is steered toward an interference and a boresight gain of each of the plurality of sub-arrays is maintained.

BRIEF DESCRIPTION OF THE DRAWINGS

[0008] The foregoing and other objects, aspects and advantages will be better understood from the following detailed description of a preferred embodiment of the invention with reference to the drawings, in which:

[0009]FIG. 1 is a block diagram of an exemplary radar system in accordance with the present invention;

[0010]FIG. 2 is a functional block diagram of an exemplary radar system in accordance with an embodiment of the invention;

[0011]FIG. 3 is an illustration of sub-array formation in accordance with an exemplary embodiment of the invention;

[0012]FIG. 4 is illustration of a linear array and overlapping sub-arrays in accordance with an exemplary embodiment of the invention; and

[0013]FIG. 5 is a flow diagram of an exemplary process for detecting a target and maintaining a monopulse ratio in the presence of multiple mainlobe and multiple sidelobe jamming interference in accordance with the present invention.

DETAILED DESCRIPTION

[0014] Monopulse radar processing is a radar processing technique in which the angular location of a target (also referred to as direction of arrival) can be determined within fractions of a beamwidth by comparing measurements received from two or more simultaneous beams. This technique for estimating the direction of arrival (DOA) of a target is often implemented in surveillance and tracking radar systems comprising a phased array antenna and a digital beamforming (DBF) processor. Typically, one beam is formed for transmission and two beams are formed upon reception for angle measurement. The term monopulse refers to the fact that the echo from a single transmitted pulse returning from a target is used to measure the angle of the target.

[0015] Monopulse processing may be implemented for a linear array of N antenna elements which provides respective signals x(0), . . . ,x(N−1) to a beamforming network. The output signals of the beamforming network are the sum, Σ, and difference, Δ, signals which are processed to generate an output signal representing the estimated direction of arrival. The sum beam pattern has a symmetrical amplitude profile with respect to its maximum at the boresight, and the difference beam pattern has an antisymmetrical amplitude profile with respect to a zero response at the boresight. In the beamforming network, each of the N input signals is split into two paths, linearly weighted, and then added together. The DOA of a target signal is determined by evaluating (e.g., from a look up table or from a graph) the ratio of the difference signal over the sum signal, as indicated by the following equation. $\begin{matrix} {m = \frac{\Delta}{\sum}} & (1) \end{matrix}$

[0016] where m is referred to as the monopulse ratio.

[0017] Monopulse processing may also be implemented for planar arrays in which the target azimuth and elevation angles are of interest. In this case the sum and difference signals represent sum and difference signals for angles in elevation and azimuth.

[0018] In an exemplary embodiment of the invention, sum, Σ, and difference, Δ, beams are adaptively formed to cancel jamming and generate estimated sum, {circumflex over (Σ)}, and estimated difference, {circumflex over (Δ)}, beams. As explained herein in detail, the estimated sum beam, is used to detect a target of interest, and the ratio of the estimated difference beam over the estimated sum beam is used to determine the estimated angle of arrival of the target of interest.

[0019]FIG. 1 is a block diagram of a radar system 100 comprising an antenna array 12 and computer processor 14 in accordance with an exemplary embodiment of the invention. The antenna array 12 comprises a plurality of elements. Each element is capable of receiving electromagnetic energy (e.g., radar energy). This electromagnetic energy is transformed (transduced) into electrical data representing the electromagnetic energy. Data is transmitted to computer processor 14. Computer processor 14 performs processes for detecting a target of interest, estimating an angle of arrival of a target of interest, and maintaining a monopulse ratio in the presence of multiple mainlobe jammers and multiple sidelobe jammers in accordance with the present invention, as herein described. Receiver signal processing may also be performed by special purpose hardware.

[0020] Exemplary antenna array 12 comprises four sub-arrays (linear arrays) in azimuth and four sub-array (linear arrays) in elevation. A single sub-array in each of azimuth and elevation are highlighted for illustrative purposes. These sub-arrays may be formed in accordance with well known analog or digital beamforming techniques. The number of elements shown in antenna array 12 and the number of sub-arrays formed are exemplary. The antenna array 12 may comprise more or less than 16 elements, and the number of sub-arrays formed may be all or less than the maximum number of sub-arrays contained in the antenna array 12.

[0021]FIG. 2 is a functional block diagram of an exemplary radar system in accordance with an embodiment of the invention. Element data received from the antenna array 12 is formed into sub-arrays in azimuth (horizontal) and elevation (vertical) by sub-array beamformer 50. Sum and difference beams are formed for each sub-array by sum and difference beamformer 52. Weights are calculated in accordance with the sum and difference beams by weight formulator 54. As explained in more detail herein, weights are calculated to cancel interference and to achieve target detection and location. Composite beams are formed from the sum and difference beams and the calculated weights by composite beamformer 56. Monopulse ratios are calculated by monopulse ratio calculator 58. These monopulse ratios are used to determine an estimated angle of arrival.

[0022] In an exemplary embodiment of the invention, sub-arrays are formed in azimuth and/or elevation. FIG. 3 is an illustration of sub-array formation, in azimuth and elevation, from the elements of antenna array 12. As shown in FIG. 3, antenna array 12 comprises K sets of measurements corresponding to K column sub-arrays, and L set of measurements corresponding to L row sub-arrays. Thus, in accordance with an exemplary embodiment of the invention, K column sub-arrays and L row sub-arrays are formed from antenna array 12. The set of column sub-arrays is further divided into sub-arrays to form sum and difference beams. Thus, the column sub-arrays are divided into sub-arrays 14, 15, and 16, and the row sub-arrays are divided into sub-arrays 17, 18, and 19.

[0023]FIG. 4 illustrates a more detailed block diagram of full antenna array 12, which may be treated as an individual linear array 20 of column sub-arrays. Linear array 20 is a 16-element array, wherein each element is a column sub-array. The total number of elements (columns) in the linear array is depicted by the letter “M”. The number of elements (columns) in each sub-array is depicted by the letter and subscript “M,”. In an exemplary embodiment of the invention, overlapping sub-arrays 22, 24, 26, 28, are formed from linear array 20. The number of overlapped sub-arrays is depicted by the letter “N”. The amount of overlap may vary and is determined by factors such as the beamwidth of the mainlobe and available degrees of freedom in the antenna aperture. Increasing the amount by which the sub-arrays overlap, increases the degree of correlation between each overlapped sub-array, and increases the degrees of freedom. The amount of overlap space between sub-arrays is depicted by the letter “D”. The amount of overlap space, D, in FIG. 4 is two elements, typically represented in terms of length (e.g., meters, millimeters). The spacing between adjacent elements is depicted by the letter “d”, and is also typically represented in terms of length. Thus, N overlapped sub-arrays are formed from an M-element linear array, wherein the element spacing is d and the overlap spacing is D. It is to be understood that linear array 20 can also be interpreted as depicting a linear array of rows, which can be divided into sub-arrays of rows, wherein the total number of rows in each sub-array is depicted by M_(y) (rather than M_(x) for column sub-arrays).

[0024] In an exemplary embodiment of the invention, to detect a radar of interest and maintain an estimated angle of arrival of the target of interest in the presence of multiple sidelobe and multiple mainlobe jamming interference, sum and difference beams are formed for each of the N sub-arrays. Weights are calculated from the sum beams and from the difference beams. In one embodiment of the invention, the weights are formed adaptively. The weights are determined such that at least one null of the beam pattern formed from the full antenna array is steered toward at least one interfering jammer. Composite sum and difference beams are formed using the sub-array sum beams, the sub-array difference beams, and the calculated weights. The composite sum beam is used to detect a target of interest. Monopulse ratios are calculated by dividing the composite difference beams by the composite sum beams. These monopulse ratios are used (e.g., through a look up table or a graph) to estimate arrival angles of a target of interest. The above weights and beams are updated to maintain the target detection and angle of arrival estimation. A mathematical description of this process is presented below with reference to FIG. 4 and FIG. 5.

[0025]FIG. 5 is a flow diagram of an exemplary process for detecting a target of interest and maintaining a monopulse ratio in the presence of multiple mainlobe and multiple sidelobe jamming interference in accordance with the present invention. Sub-arrays are formed in step 30. This step includes forming linear sub-arrays from the full antenna array and forming overlapped sub-arrays for calculating sum and difference beams. Sum beams are formed for each sub-array, 1 through N (step 32 ). Thus, as shown in FIG. 4, a sum beam is formed for each sub-array 22, 24, 26, and 28, Σ₁, Σ₂, Σ₃, and Σ_(N), respectively. Assuming the linear array, formed from the full antenna array, is an array in azimuth, the first sum beam is formed in accordance with the following equation. $\begin{matrix} {{\sum\limits_{1}^{a}\left( {T_{x},T_{y}} \right)} = {{\cos \left( {2\quad \pi \quad T_{x}\frac{M_{x}d_{x}}{2\quad \lambda}} \right)}{\alpha_{x}\left( T_{x} \right)}{\beta \left( T_{y} \right)}}} & (2) \end{matrix}$

[0026] where, Σ₁ ^(a) is the sum beam for the 1^(st) sub-array, and is a function of T_(x) and T_(y); M_(x) is the number of columns in the linear sub-array; d_(x) is the spacing, in azimuth, between columns in the antenna array (in meters); λ is the wavelength of the transmitted radar energy (in meters); and α_(x)(T_(x)) is a function of T_(x) and β(T_(y)) is a function to T_(y), calculated in accordance with the following equations. $\begin{matrix} {{{\alpha_{x}\left( T_{x} \right)} = {^{j\quad 2\quad \pi \quad {T_{x}{(\frac{M_{x} - 1}{2})}}\frac{d_{x}}{\lambda}}\left\lbrack \frac{\sin \left( {2\quad \pi \quad T_{x}\frac{M_{x}d_{x}}{4\quad \lambda}} \right)}{\sin \left( {2\quad \pi \quad T_{x}\frac{d_{x}}{2\quad \lambda}} \right)} \right\rbrack}},} & (3) \\ {{{\beta \left( T_{y} \right)} = {^{j\quad 2\quad \pi \quad {T_{y}{(\frac{N - 1}{2})}}\frac{d_{y}}{\lambda}}\left\lbrack \frac{\sin \left( {2\quad \pi \quad T_{y}\frac{N\quad d_{y}}{4\quad \lambda}} \right)}{\sin \left( {2\quad \pi \quad T_{y}\frac{d_{y}}{2\quad \lambda}} \right)} \right\rbrack}},} & (4) \end{matrix}$

[0027] where, d_(y) is the spacing, in elevation, between rows in the antenna array (in meters); and T_(x) is the azimuth directional cosine and T_(y) is the elevation directional cosine, calculated in accordance with the following equations.

T _(x)=cos(β)sin(θ), and   (5)

T _(y)=sin(θ),   (6)

[0028] where, θ and β are the steering angles, in azimuth and elevation, respectively, off boresight of the antenna array.

[0029] The right hand side of equation (3), $\begin{matrix} {\left\lbrack \frac{\sin \left( {2\quad \pi \quad T_{x}\frac{M_{x}\quad d_{x}}{4\quad \lambda}} \right)}{\sin \left( {2\quad \pi \quad T_{x}\frac{d_{x}}{2\quad \lambda}} \right)} \right\rbrack,} & (7) \end{matrix}$

[0030] is know as the snic function. The snic function is analogous to the well known sinc function (i.e., $\left( {{i.e.},\frac{\sin (x)}{x}} \right)$

[0031] for analog signals. The snic function is a result of the uniform windowing (tapering) used to form the sum beams. Any appropriate windowing function, as is well know in the art, may be used.

[0032] If the linear array formed from the antenna array is in elevation rather than azimuth, the sum beam equation is similar to equation (2). However, T_(y) is substituted for T_(x), where T_(y) is the directional cosine in elevation. Thus, assuming the linear array is an array in elevation, the first sum beam is formed in accordance with the following equation. $\begin{matrix} {{{\sum\limits_{1}^{e}\left( {T_{x},T_{y}} \right)} = {{\cos \left( {2\quad \pi \quad T_{y}\frac{M_{y}d_{y}}{2\quad \lambda}} \right)}{\alpha_{y}\left( T_{y} \right)}{\gamma \left( T_{x} \right)}}},} & (8) \end{matrix}$

[0033] where, Σ₁ ^(e) (T_(x),T_(y)) is the sum beam for the 1^(st) sub-array, and is a function of T_(x) and T_(y); M_(y) is the number of rows in the linear sub-array; d_(y) is the spacing between rows in the antenna array (in meters); λ is the wavelength of the transmitted radar energy (in meters); and α_(y)(T_(y)) is a function of T_(y) and γ(T_(x)) is a function of T_(x) and are calculated in accordance with the following equations. $\begin{matrix} {{{\alpha_{y}\left( T_{y} \right)} = {^{j\quad 2\quad \pi \quad {T_{y}{(\frac{M_{y} - 1}{2})}}\frac{d_{y}}{\lambda}}\left\lbrack \frac{\sin \left( {2\quad \pi \quad T_{y}\frac{M_{y}d_{y}}{4\quad \lambda}} \right)}{\sin \left( {2\quad \pi \quad T_{y}\frac{d_{y}}{2\quad \lambda}} \right)} \right\rbrack}},} & (9) \\ {{{\gamma \left( T_{x} \right)} = {^{j\quad 2\quad \pi \quad {T_{x}{(\frac{M - 1}{2})}}\frac{d_{x}}{\lambda}}\left\lbrack \frac{\sin \left( {2\quad \pi \quad T_{x}\frac{M\quad d_{x}}{4\quad \lambda}} \right)}{\sin \left( {2\quad \pi \quad T_{x}\frac{d_{x}}{2\quad \lambda}} \right)} \right\rbrack}},} & (10) \end{matrix}$

[0034] where M is the total number of columns in the linear array (see FIG. 4).

[0035] The sum beams in azimuth for the remaining sub-arrays, 2 through N, Σ₂ ^(a) (T_(x),T_(y)) through Σ_(N) ^(a) (T_(x),T_(y)), respectively, are calculated in accordance with the following equation. $\begin{matrix} {{{\sum\limits_{n}^{a}\left( {T_{x},T_{y}} \right)} = {^{j\quad 2\quad \pi \quad {T_{x}{({n - 1})}}\frac{D}{\lambda}}{\sum\limits_{1}^{a}\left( {T_{x},T_{y}} \right)}}},{n = 1},2,{\ldots \quad N}} & (11) \end{matrix}$

[0036] where n is the index of the sub-array, and D is the overlap spacing between the sub-arrays (in meters).

[0037] The sum beams in elevation for the remaining sub-arrays, 2 through $N,{\sum\limits_{2}^{e}\left( {T_{x},T_{y}} \right)}$

[0038] through ${\sum\limits_{N}^{e}\left( {T_{x},T_{y}} \right)},$

[0039] respectively, are calculated in accordance with the following equation. $\begin{matrix} {{{\sum\limits_{n}^{e}\left( {T_{x},T_{y}} \right)} = {^{j\quad 2\quad \pi \quad {T_{y}{({n - 1})}}\frac{D}{\lambda}}{\sum\limits_{1}^{e}\left( {T_{x},T_{y}} \right)}}},{n = 1},2,{\ldots \quad N}} & (12) \end{matrix}$

[0040] Difference beams are formed in step 34. If the linear array, formed from the antenna array, is an array in azimuth, the first difference beam, Δ₁^(a)(T_(x), T_(y)),

[0041] is formed in accordance with the following equation. $\begin{matrix} {{{\Delta_{1}^{a}\left( {T_{x},T_{y}} \right)} = {{\sin\left( \quad {2\quad \pi \quad T_{x}\frac{M_{x}d_{x}}{2\quad \lambda}} \right)}{\alpha_{x}\left( T_{x} \right)}{\beta \left( T_{y} \right)}}},} & (13) \end{matrix}$

[0042] where, Δ₁ ^(a) (T_(x),T_(y)) is the difference beam, in azimuth, for the 1^(st) sub-array and is a function of T_(x) and T_(y),

[0043] If the linear array, formed from the antenna array, is in elevation rather than azimuth, the first difference beam, Δ₁^(e)(T_(x), T_(y)),

[0044] is formed in accordance with the following equation. $\begin{matrix} {{{\Delta_{1}^{e}\left( {T_{x},T_{y}} \right)} = {{\sin\left( \quad {2\quad \pi \quad T_{x}\frac{M_{x}d_{x}}{2\quad \lambda}} \right)}{\alpha_{y}\left( T_{y} \right)}{\gamma \left( T_{x} \right)}}},} & (14) \end{matrix}$

[0045] where, Δ₁ ^(e) (T_(x),T_(y)) is the difference beam, in elevation, for the 1^(st) sub-array, and is a function of T_(x) and T_(y),

[0046] The difference beams in azimuth for the remaining sub-arrays, 2 through N, Δ₂ ^(a) (T_(x),T_(y)) through Δ_(N) ^(a) (T_(x),T_(y)), respectively, are calculated in accordance with the following equation. $\begin{matrix} {{{\Delta_{n}^{a}\left( {T_{x},T_{y}} \right)} = {^{j\quad 2\quad \pi \quad {T_{x}{({n - 1})}}\frac{D}{\lambda}}{\Delta_{1}^{a}\left( {T_{x},T_{y}} \right)}}},{n = 1},2,{\ldots \quad N}} & (15) \end{matrix}$

[0047] where n is the index of the sub-array, and D is the overlap spacing between the sub-arrays (in meters).

[0048] The difference beams in elevation for the remaining sub-arrays, 2 through N, Δ₂^(e)(T_(x), T_(y))

[0049] through Δ_(N) ^(e) (T_(x),T_(y)), respectively, are calculated in accordance with the following equation. $\begin{matrix} {{{\Delta_{n}^{e}\left( {T_{x},T_{y}} \right)} = {^{j\quad 2\quad \pi \quad {T_{y}{({n - 1})}}\frac{D}{\lambda}}{\Delta_{1}^{e}\left( {T_{x},T_{y}} \right)}}},{n = 1},2,{\ldots \quad N}} & (16) \end{matrix}$

[0050] Weights are calculated for the sum beams in step 36, and for the difference beams in step 38. Weights are calculated such that the resultant beam patterns have at least one null steered toward at least one source of interference. Weights may be calculated such that the nulls are pointed in the direction of known or expected interference. Weights may also be calculated adaptively, such that the null locations are updated automatically, resulting in estimated null locations.

[0051] In an exemplary embodiment of the invention, adaptive processing techniques are implemented to reduce interference due to jamming in steps 36 and 38. Various adaptive processing techniques may be implemented depending upon the number of available antenna element data. Examples of adaptive processing techniques include a main auxiliary adaptation technique, an adaptive-adaptive processing technique, and a fully adaptive array technique. In the main auxiliary adaptation technique, main beam and auxiliary beams (beams having approximately omnidirectional beam patterns and relatively low gain) are formed from available array elements, which are capable of being shared among multiple beams. The auxiliary beams are used to cancel the sidelobe jamming in the sum beam. In the adaptive-adaptive processing technique, the auxiliary beams are steered in the direction of the jammers. As is the case in the main auxiliary adaptation technique, the auxiliary beams are used to cancel jamming in the sum beam. In the fully adaptive array technique, all elements of the array are used to cancel jamming while the sum beam is formed from all elements of the array.

[0052] Sum and difference weights are formulated to minimize jamming interference by steering at least one null toward a jamming interference. Weights are calculated under a constraint to maintain the boresight gain of the sub-array beams. Thus, upon detection of a target of interest, the mainlobe of each beam pattern is steered toward the target of interest and a null is steered toward a jamming interference. The sum and difference weights, W_(Σ) and W_(Δ), respectively, are formulated to minimizing jamming interference power, J, in accordance with the following equations. $\begin{matrix} {{W_{\sum} = \frac{R_{\sum\sum}^{- 1_{\delta}}}{\delta^{H}R_{\sum\sum}^{{- 1}\delta}}},{and}} & (17) \\ {{W_{\Delta} = \frac{R_{\Delta\Delta}^{- 1_{\delta}}}{\delta^{H}R_{\Delta\Delta}^{{- 1}\delta}}},} & (18) \end{matrix}$

[0053] where, R_(ΣΣ) is the covariance matrix measurement of the sum beams Σ₁ through Σ_(N); R_(ΔΔ) is the covariance matrix measurement of the difference beams (calculated in azimuth or elevation); the superscript H indicates the complex conjugate transpose; the superscript −1 indicates the inverse, and delta, δ, is defined as the following vector. $\begin{matrix} {\delta = \begin{bmatrix} 1 \\ 0 \\ \bullet \\ \bullet \\ \bullet \\ 0 \end{bmatrix}} & (19) \end{matrix}$

[0054] For a large jammer power to noise power ration (referred to as jammer to noise ratio, JNR), the sum and difference weights are approximately equal. Thus,

W _(Δ) ≈W _(Σ) =W, for large JNR  (20)

[0055] Weights are formulated to minimize jammer power, J₁, where J₁ is given by the following equation.

J ₁ =W _(Σ) ^(H) R _(ΣΣ) W _(Σ)−λ(δ^(H) W _(Σ)−1)  (21)

[0056] In order to maintain monopulse accuracy in azimuth and elevation by allowing slight degradation in jamming cancellation, the following formulations of jammer power in azimuth, J_(a), and jammer power in elevation, J_(e), are minimized.

J _(a) =W _(a) ^(H)(R _(ΣΣ) +R _(Δ) _(a) _(Δ) _(a) )W _(a)−λ(δ^(H) W _(a)−1)  (22)

J _(e) =W _(e) ^(H)(R _(ΣΣ) +R _(Δ) _(e) _(Δ) _(e) )W _(a)−λ(δ^(H) W _(e)−1)  (23)

[0057] where R_(Δ) _(a) _(Δ) _(a) is the covariance matrix measurement of the difference beams in azimuth and R_(Δ) _(e) _(Δ) _(e) is the covariance matrix measurement of the difference beams in elevation. Minimizing equations (22) and (23) with respect to W_(a) ^(H) and W_(e) ^(H) respectively, results in the following equation for weight vectors, W_(a) and W_(e). $\begin{matrix} {W_{a} = \frac{\left( {R_{\Sigma\Sigma} + R_{\Delta_{a}\Delta_{a}}} \right)^{- 1}\delta}{{\delta^{H}\left( {R_{\Sigma\Sigma} + R_{\Delta_{a}\Delta_{a}}} \right)}^{- 1}\delta}} & (24) \\ {W_{e} = \frac{\left( {R_{\Sigma\Sigma} + R_{\Delta_{e}\Delta_{e}}} \right)^{- 1}\delta}{{\delta^{H}\left( {R_{\Sigma\Sigma} + R_{\Delta_{e}\Delta_{e}}} \right)}^{- 1}\delta}} & (25) \end{matrix}$

[0058] The weight vectors, W_(a) and W_(e), in azimuth and elevation, respectively, for sum and difference beam formulation, tend to preserve the monopulse ratio for a target signal with only a slight degradation in jamming cancellation capability. However, for high values of JNR, this degradation becomes insignificant.

[0059] Composite sum beams are formed in step 40. A composite sum beam, Σ, comprises the weighted summation of the sum beams formed for the s individual sub-arrays (Σ₁ through Σ_(N)). Composite difference beams are formed in step 42. A composite difference beam, Δ, comprises the weighted summation of the difference beams formed for the individual sub-arrays (Δ₁ through Δ_(N)). Composite sum and difference beams are formed in azimuth and elevation. The composite sum and difference beams are formed in accordance with the following equations. $\begin{matrix} {{{\hat{\Sigma}}_{A} = {\Sigma_{1}^{a} - {W_{a{(1)}}\Sigma_{2}^{a}} - \ldots - {W_{a{({N - 1})}}\Sigma_{N}^{a}}}},} & (26) \\ {{\hat{\Delta}}_{A} = {\Delta_{1}^{a} - {W_{a{(1)}}\Delta_{2}^{a}} - \ldots - {W_{a{({N - 1})}}\Delta_{N}^{a}}}} & (27) \\ {{{\hat{\Sigma}}_{E} = {\Sigma_{1}^{e} - {W_{e{(1)}}\Sigma_{2}^{e}} - \ldots - {W_{e{({N - 1})}}\Sigma_{N}^{e}}}},\quad \text{and}} & (28) \\ {{\hat{\Delta}}_{E} = {\Delta_{1}^{e} - {W_{e{(1)}}\Delta_{2}^{e}} - \ldots - {W_{e{({N - 1})}}\Delta_{N}^{e}}}} & (29) \end{matrix}$

[0060] where, {circumflex over (Σ)}_(A) is the estimated composite sum beam in azimuth, {circumflex over (Σ)}_(E) is the estimated composite sum beam in elevation, {circumflex over (Δ)}_(A) is the estimated composite difference beam in azimuth, and {circumflex over (Δ)}_(E) is the estimated composite difference beam in elevation. The values of the composite sum and difference beams are estimates (indicated by the circumflex, “^ ”) when the weights are determined adaptively. If the weights are determined deterministically, the composite sum and differences beams are not estimates.

[0061] Monopulse ratios, in azimuth and elevation, are calculated in step 44. A monopulse ratio is the ratio of the difference beam over the sum beam as shown in equation (1). In step 44, monopulse ratios are calculated from the ratio of the composite sum and difference beams as derived in equations (26), (27), (28), and (29). Thus, a monopulse ratio in azimuth, for example, is calculated in accordance with the following equation. $\begin{matrix} \begin{matrix} {{\hat{m}}_{A} = \quad {\frac{{\hat{\Delta}}_{A}}{{\hat{\Sigma}}_{A}} = \frac{\Delta_{1}^{a} - {W_{a{(1)}}\Delta_{2}^{a}} - \ldots - {W_{a{({N - 1})}}\Delta_{N}^{a}}}{\Sigma_{1}^{a} - {W_{a{(1)}}\Sigma_{2}^{a}} - \ldots - {W_{a{({N - 1})}}\Sigma_{N}^{a}}}}} \\ {= \quad \frac{{\sin \left( {2\pi \quad T_{x}M_{X}\frac{d_{X}}{2\lambda}} \right)}\begin{pmatrix} {1 - {W_{a{(1)}}^{j\quad 2\pi \quad T_{x}\frac{D}{\lambda}}} - \ldots} \\ {{- W_{a{({N - 1})}}}^{{j2\pi}\quad {T_{x}{({N - 1})}}\frac{D}{\lambda}}} \end{pmatrix}{\beta \left( T_{y} \right)}}{\cos \quad \left( {2\pi \quad T_{x}M_{x}\frac{d_{x}}{2\lambda}} \right)\begin{pmatrix} {1 - {W_{a{(1)}}^{{j2\pi}\quad T_{x}\frac{D}{\lambda}}} - \ldots} \\ {{- W_{a{({N - 1})}}}^{j\quad 2\pi \quad {T_{x}{({N - 1})}}\frac{D}{\lambda}}} \end{pmatrix}{\beta \left( T_{y} \right)}}} \\ {= \quad {\tan \left( {2\pi \quad T_{x}M_{x}\frac{d_{x}}{2\lambda}} \right)}} \end{matrix} & (30) \end{matrix}$

[0062] A monopulse ratio in elevation is determined in a similar fashion to the monopulse ration in azimuth. Thus, a monopulse ratio in elevation is calculated in accordance with the following equation. $\begin{matrix} \begin{matrix} {{\hat{m}}_{E} = \quad {\frac{{\hat{\Delta}}_{E}}{{\hat{\Sigma}}_{E}} = \frac{\Delta_{1}^{e} - {W_{e{(1)}}\Delta_{2}^{e}} - \ldots - {W_{e{({N - 1})}}\Delta_{N}^{e}}}{\Sigma_{1}^{e} - {W_{e{(1)}}\Sigma_{2}^{e}} - \ldots - {W_{e{({N - 1})}}\Sigma_{N}^{e}}}}} \\ {= \quad \frac{{\sin \left( {2\pi \quad T_{y}M_{y}\frac{d_{y}}{2\lambda}} \right)}\begin{pmatrix} {1 - {W_{e{(1)}}^{j\quad 2\pi \quad T_{y}\frac{D}{\lambda}}} - \ldots} \\ {{- W_{e{({N - 1})}}}^{{j2\pi}\quad {T_{y}{({N - 1})}}\frac{D}{\lambda}}} \end{pmatrix}{\gamma \left( T_{x} \right)}}{\cos \quad \left( {2\pi \quad T_{y}M_{y}\frac{d_{y}}{2\lambda}} \right)\begin{pmatrix} {1 - {W_{e{(1)}}^{{j2\pi}\quad T_{y}\frac{D}{\lambda}}} - \ldots} \\ {{- W_{e{({N - 1})}}}^{j\quad 2\pi \quad {T_{y}{({N - 1})}}\frac{D}{\lambda}}} \end{pmatrix}{\gamma \left( T_{x} \right)}}} \\ {= \quad {\tan \left( {2\pi \quad T_{y}M_{y}\frac{d_{y}}{2\lambda}} \right)}} \end{matrix} & (31) \end{matrix}$

[0063] Sum and difference beams, weight values, and monopulse ratios are updated in step 46. Updates may be accomplished adaptively. In an exemplary embodiment of the invention, weights are calculated adaptively (and therefore updated adaptively), and all calculations using the adaptively formed weights are updated accordingly.

[0064] In accordance with an exemplary embodiment of the invention, processing data from a planar antenna array comprised forming sum and difference sub-arrays along the rows (azimuth) and columns (elevation) of the antenna array separately. The sub-arrays are adaptively beamformed to generate sum and difference beam pairs in azimuth and elevation. The two sum beams (in azimuth and elevation) are combined to detect a target of interest. Monopulse ratios are formed for each sum and difference pair to generate azimuth and elevation angle estimation of the target.

[0065] The present invention may be embodied in the form of computer-implemented processes and apparatus for practicing those processes. The present invention may also be embodied in the form of computer program code embodied in tangible media, such as floppy diskettes, read only memories (ROMs), CD-ROMs, hard drives, high density disk, or any other computer-readable storage medium, wherein, when the computer program code is loaded into and executed by computer processor 32, the computer processor 32 becomes an apparatus for practicing the invention. The present invention may also be embodied in the form of computer program code, for example, whether stored in a storage medium, loaded into and/or executed by computer processor 32, or transmitted over some transmission medium, such as over electrical wiring or cabling, through fiber optics, or via electromagnetic radiation, wherein, when the computer program code is loaded into and executed by computer processor 32, the computer processor 32 becomes an apparatus for practicing the invention. When implemented on a general-purpose processor, the computer program code segments configure the processor to create specific logic circuits.

[0066] Although illustrated and described herein with reference to certain specific embodiments, the present invention is nevertheless not intended to be limited to the details shown. Rather, various modifications may be made in the details within the scope and range of equivalents of the claims and without departing from the spirit of the invention. 

What is claimed is:
 1. A method for detecting a radar target of interest in the presence of radar jamming interference, said method comprising the steps of: forming a plurality of sub-arrays from an antenna array; forming a respective sum beam for each of said plurality of sub-arrays, calculating sum weights in accordance with said sum beams; and forming at least one composite sum beam in accordance with said sum weights and said sum beams for detecting said target of interest.
 2. A method in accordance with claim 1, wherein at least one null of each of said at least one composite sum beam is steered toward an interference and a boresight gain of each of said plurality of sub-arrays is maintained.
 3. A method in accordance with claim 1, further comprising the steps of: forming a respective difference beam for each of said plurality of sub-arrays; calculating difference weights in accordance with said difference beams; forming at least one composite difference beam in accordance with said difference weights and said difference beams, wherein at least one null of each of said at least one composite difference beam is steered toward an interference; and calculating at least one monopulse ratio from said composite sum and difference beams for estimating an angle of arrival of said target of interest.
 4. A method in accordance with claim 1, wherein said composite sum and difference beams are formed in accordance with weight vectors formed in accordance with the following equations: $\begin{matrix} {{W_{a} = \frac{\left( {R_{\Sigma\Sigma} + R_{\Delta_{a}\Delta_{a}}} \right)^{- 1}\delta}{{\delta^{H}\left( {R_{\Sigma\Sigma} + R_{\Delta_{a}\Delta_{a}}} \right)}^{- 1}\delta}};\text{and}} \\ {{W_{e} = \frac{\left( {R_{\Sigma\Sigma} + R_{\Delta_{e}\Delta_{e}}} \right)^{- 1}\delta}{{\delta^{H}\left( {R_{\Sigma\Sigma} + R_{\Delta_{e}\Delta_{e}}} \right)}^{- 1}\delta}};} \end{matrix}$

wherein R_(ΣΣ) is a covariance matrix measurement of the sum beams; R_(Δ) _(a) _(Δ) _(a) is a covariance matrix measurement of difference beams in azimuth; R_(Δ) _(e) _(Δ) _(e) is a covariance matrix measurement of difference beams in elevation; superscript “H” indicates a complex conjugate transpose; superscript “−1” indicates an inverse; and $\delta = {\begin{bmatrix} 1 \\ 0 \\ \vdots \\ 0 \end{bmatrix}.}$


5. A method in accordance with claim 3, wherein said composite sum beams and composite difference beams are formed in at least one of azimuth and elevation.
 6. A method in accordance with claim 3, wherein said weights are adaptively calculated.
 7. A method in accordance with claim 3, wherein all beams are digital beam formed.
 8. A method in accordance with claim 3, further comprising the step of maintaining said detection of target of interest and said angle of arrival by updating said weights.
 9. A radar system for detecting a radar target of interest in the presence of interference, said system comprising: a sub-array beamformer for forming a plurality of sub-arrays from an antenna array; a sum and difference beamformer for forming respective sum beams and difference beams for each of said plurality of sub-arrays; a weight calculator for calculating sum and difference weights in accordance with said sum beams and said difference beams, respectively; a composite beamformer for forming at least one composite sum beam in accordance with said sum weights and said sum beams, and for forming at least one composite difference beam in accordance with said difference weights and said difference beams, and a monopulse ratio calculator for calculating at least one monopulse ratio from said composite sum and difference beams.
 10. A radar system in accordance with claim 9, wherein at least one null of each of said at least one composite sum beam and at least one null of each of said at least one composite difference beam is steered toward an interference and a boresight gain of each of said plurality of sub-arrays is maintained.
 11. A radar system in accordance with claim 9, wherein said composite sum and composite difference beams are formed in accordance with the following equations: $\begin{matrix} {{{\hat{\Sigma}}_{A} = {\Sigma_{1}^{a} - {W_{a{(1)}}\Sigma_{2}^{a}} - \ldots - {W_{a{({N - 1})}}\Sigma_{N}^{a}}}},} \\ {{{\hat{\Delta}}_{A} = {\Delta_{1}^{a} - {W_{a{(1)}}\Delta_{2}^{a}} - \ldots - {W_{a{({N - 1})}}\Delta_{N}^{a}}}};} \\ {{{\hat{\Sigma}}_{E} = {\Sigma_{1}^{e} - {W_{e{(1)}}\Sigma_{2}^{e}} - \ldots - {W_{e{({N - 1})}}\Sigma_{N}^{e}}}},\quad \text{and}} \\ {{\hat{\Delta}}_{E} = {\Delta_{1}^{e} - {W_{e{(1)}}\Delta_{2}^{e}} - \ldots - {W_{e{({N - 1})}}\Delta_{N}^{e}}}} \end{matrix}$

wherein, {circumflex over (Σ)}_(A) is an estimated composite sum beam in azimuth; {circumflex over (Σ)}_(E) is an estimated composite sum beam in elevation; {circumflex over (Δ)}_(A) is an estimated composite difference beam in azimuth; {circumflex over (Δ)}_(E) is an estimated composite difference beam in elevation Σ₁ ^(a), Σ₂ ^(a), and Σ_(N) ^(a) are sum beams for a first, second, and an N^(th) sub-array in azimuth, respectively; Δ₁ ^(a), Δ₂ ^(a), and Δ_(N) ^(a) are difference beams for a first, second, and an N^(th) sub-array in azimuth, respectively; Σ₁ ^(e), Σ₂ ^(e), and Σ_(N) ^(e) are sum beams for a first, second, and an N^(th) sub-array in elevation, respectively; Δ₁ ^(e), Δ₂ ^(e), and Δ_(N) ^(e) are difference beams for a first, second, and an N^(th) sub-array in elevation, respectively; W_(a) is a weight vector for sum and difference beam formation for azimuth beams; and W_(e) is a weight vector for sum and difference beam formation for elevation beams.
 12. A radar system in accordance with claim 10, said weights are formed in accordance with the following equations: $\begin{matrix} {{W_{a} = \frac{\left( {R_{\Sigma\Sigma} + R_{\Delta_{a}\Delta_{a}}} \right)^{- 1}\delta}{{\delta^{H}\left( {R_{\Sigma\Sigma} + R_{\Delta_{a}\Delta_{a}}} \right)}^{- 1}\delta}};\text{and}} \\ {{W_{e} = \frac{\left( {R_{\Sigma\Sigma} + R_{\Delta_{e}\Delta_{e}}} \right)^{- 1}\delta}{{\delta^{H}\left( {R_{\Sigma\Sigma} + R_{\Delta_{e}\Delta_{e}}} \right)}^{- 1}\delta}};} \end{matrix}$

wherein R_(ΣΣ) is a covariance matrix measurement of the sum beams; R_(Δ) _(a) _(Δ) _(a) is a covariance matrix measurement of difference beams in azimuth; R_(Δ) _(e) _(Δ) _(e) is a covariance matrix measurement of difference beams in elevation; superscript “H” indicates a complex conjugate transpose; superscript −1 indicates an inverse; and $\delta = {\begin{bmatrix} 1 \\ 0 \\ \vdots \\ 0 \end{bmatrix}.}$


13. A computer readable medium having embodied thereon a computer program for detecting a radar target of interest in the presence of a interference, the computer readable program comprising: means for causing said computer to digitally form respective sum beams and difference beams for each of said plurality of sub-arrays; means for causing said computer to adaptively calculate sum and difference weights in accordance with said sum beams and said difference beams, respectively; means for causing said computer to digitally form at least one composite sum beam in accordance with said sum weights and said sum beams, and to digitally form at least one composite difference beam in accordance with said difference weights and said difference beams, wherein at least one null of each of said at least one composite sum beam and at least one null of each of said at least one composite difference beam is steered toward an interference and a boresight gain of each of said plurality of sub-arrays is maintained; and means for causing said computer to calculate at least one monopulse ratio from said composite sum and difference beams.
 14. A computer readable medium in accordance with claim 12, wherein said computer program causes said computer to form said composite sum and difference beams in accordance with the following equations: $\begin{matrix} {{{\hat{\Sigma}}_{A} = {\Sigma_{1}^{a} - {W_{a{(1)}}\Sigma_{2}^{a}} - \ldots - {W_{a{({N - 1})}}\Sigma_{N}^{a}}}},} \\ {{{\hat{\Delta}}_{A} = {\Delta_{1}^{a} - {W_{a{(1)}}\Delta_{2}^{a}} - \ldots - {W_{a{({N - 1})}}\Delta_{N}^{a}}}};} \\ {{{\hat{\Sigma}}_{E} = {\Sigma_{1}^{e} - {W_{e{(1)}}\Sigma_{2}^{e}} - \ldots - {W_{e{({N - 1})}}\Sigma_{N}^{e}}}},\quad \text{and}} \\ {{\hat{\Delta}}_{E} = {\Delta_{1}^{e} - {W_{e{(1)}}\Delta_{2}^{e}} - \ldots - {W_{e{({N - 1})}}\Delta_{N}^{e}}}} \end{matrix}$

wherein, {circumflex over (Σ)}_(A) is an estimated composite sum beam in azimuth; {circumflex over (Σ)}_(E) is an estimated composite sum beam in elevation; {circumflex over (Δ)}_(A) is an estimated composite difference beam in azimuth; {circumflex over (Δ)}_(E) is an estimated composite difference beam in elevation Σ₁ ^(a), Σ₂ ^(a), and Σ_(N) ^(a) are sum beams for a first, second, and an N^(th) sub-array in azimuth, respectively; Δ₁ ^(a), Δ₂ ^(a), and Δ_(N) ^(a) are difference beams for a first, second, and an N^(th) sub-array in azimuth, respectively; Σ₁ ^(e), Σ₂ ^(e), and Σ_(N) ^(e) are sum beams for a first, second, and an N^(th) sub-array in elevation, respectively; Δ₁ ^(e), Δ₂ ^(e), and Δ_(N) ^(e) are difference beams for a first, second, and an N^(th) sub-array in elevation, respectively; and W_(a) is a weight vector for sum and difference beam formation for azimuth beams; and W_(e) is a weight vector for sum and difference beam formation for elevation beams.
 15. A computer readable medium in accordance with claim 12, wherein said weights are formed in accordance with the following equations: ${W_{a} = \frac{\left( {R_{\Sigma\Sigma} + R_{\Delta_{a}\Delta_{a}}} \right)^{- 1}\delta}{{\delta^{H}\left( {R_{\Sigma\Sigma} + R_{\Delta_{a}\Delta_{a}}} \right)}^{- 1}\delta}};{and}$

${W_{e} = \frac{\left( {R_{\Sigma\Sigma} + R_{\Delta_{e}\Delta_{e}}} \right)^{- 1}\delta}{{\delta^{H}\left( {R_{\Sigma\Sigma} + R_{\Delta_{e}\Delta_{e}}} \right)}^{- 1}\delta}};$

wherein R_(ΣΣ) is a covariance matrix measurement of the sum beams; R_(Δ) _(a) _(Δ) _(a) is a covariance matrix measurement of difference beams in azimuth; R_(Δ) _(e) _(Δ) _(e) is a covariance matrix measurement of difference beams in elevation; superscript “H” indicates a complex conjugate transpose; superscript “−1” indicates an inverse; and $\delta = {\begin{bmatrix} 1 \\ 0 \\ \vdots \\ 0 \end{bmatrix}.}$ 